Second-Order Studniarski Derivatives: Computation and Application

It is known that second-order Studniarski derivatives can be used to compute tangents to the solution set of a generalized equation when standard (first-order) regularity conditions are absent, but relaxed (second-order) regularity conditions are fulfilled. This fact, roughly speaking, is only relev...

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Veröffentlicht in:Set-valued and variational analysis Jg. 33; H. 3; S. 28
1. Verfasser: Jelitte, Mario
Format: Journal Article
Sprache:Englisch
Veröffentlicht: Dordrecht Springer Netherlands 01.09.2025
Springer Nature B.V
Schlagworte:
Analysis
Calculus
Computation
Mathematics
Mathematics and Statistics
Optimization
Original Research
Regularity
Tangents
Second-order tangent set
49J53
90C46
Hölder metric subregularity
49J52
Generalized equation
Coderivative
90C33
Second-order Studniarski derivative
2-Regularity
Contingent derivative
Tangent cone
ISSN:1877-0533, 1877-0541
Online-Zugang:Volltext
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Zusammenfassung:It is known that second-order Studniarski derivatives can be used to compute tangents to the solution set of a generalized equation when standard (first-order) regularity conditions are absent, but relaxed (second-order) regularity conditions are fulfilled. This fact, roughly speaking, is only relevant in practice as long as the computation of the Studniarski derivatives itself does not incur any additional cost. However, by now the computation of these derivatives proved challenging. In this paper we explain how the second-order Studniarski derivative of the sum of a smooth single-valued and a generic set-valued mapping can be computed in terms of well-established first- and second-order objects from variational analysis. The key to these computations is a new verifiable condition that links first- and second-order information about the considered mappings. In addition, we address some tractable conditions guaranteeing relaxed regularity, and study applications to generalized equations with convex or polyhedral (set-valued) ingredients, including complementarity systems. Overall, our findings unify and improve a number of existing results on both the computation of second-order Studniarski derivatives and the computation of tangents to the solution set of a generalized equation under relaxed regularity conditions.
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ISSN:1877-0533
1877-0541
DOI:10.1007/s11228-025-00766-2